If `a >2b >0,` then find the positive value of `m` for which `y=m x-bsqrt(1+m^2)` is a common tangent to `x^2+y^2=b^2` and `(x-a)^2+y^2=b^2dot`

If a > 2b > 0, then the positive value of m for which y=mx-bsqrt(1-m^2) is a common tangent to x^2+y^2=b^2 and (x-a)^2 +y^2=b^2 is :

If a>2b>0, then find the positive value of m for which y=mx-b sqrt(1+m^(2)) is a common tangent to x^(2)+y^(2)=b^(2) and (x-a)^(2)+y^(2)=b^(2)

If a>2b>0 , then the positive value of m for which y=mx-bsqrt(1+m^2) is a common tangent to x^2+y^2=b^2 and (x-a)^2+y^2=b^2 , is

if a>2b>0, then positive value of m for which y=mx-b sqrt(1+m^(2)) is a common tangent to x^(2)+y^(2)=b^(2) and (x-a)^(2)+y^(2)=b^(2) is

If a gt 2b gt 0 , then the positive value of m for which the line y= mx -b sqrt(1+m^(2)) is a common tangent to the circles x^(2) + y^(2) = b^(2) and (x - a)^(2) + y^(2) = b^(2) is-

Given that a gt 2b gt 0 and that the line y = mx - b sqrt(1 + m^(2)) is a common tangent to the circles x^(2) +y^(2) = b^(2) and (x - a)^(2) + y^(2) = b^(2) . Then the positive value of m is

Find the value of m for which y=m x+6 is tangent to the hyperbola (x^2)/(100)-(y^2)/(49)=1

Find the value of m for which y=m x+6 is tangent to the hyperbola (x^2)/(100)-(y^2)/(49)=1

Find the value of m for which y=m x+6 is tangent to the hyperbola (x^2)/(100)-(y^2)/(49)=1